Hadamard–Rybczynski equation

In fluid dynamics, the Hadamard–Rybczynski equation gives the terminal velocity of slowly moving spherical bubble through an ambient fluid. It is named after Jacques Hadamard and Witold Rybczynski:

 W_b = \frac{2}{3} \frac {R^2 g (\rho_b - \rho_o)}{\mu_o}
 \frac {\mu_o + \mu_b}{2\mu_o + 3\mu_b}

where

The Hadamard–Rybczynski equation can be derived from the Navier–Stokes equations by considering only the buoyancy force and drag force acting on the moving bubble. The surface tension force and inertia force of the bubble are neglected.[1]

References

  1. Clift, R. C., Grace, B. J., and Weber, M. E., (2005). Bubbles, Drops, and Particles. Dover Publications. ISBN 978-0-486-44580-9.

Further reading

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